English

Generating subgroups of ray class groups with small prime ideals

Number Theory 2019-02-13 v1

Abstract

Explicit bounds are given on the norms of prime ideals generating arbitrary subgroups of ray class groups of number fields, assuming the Extended Riemann Hypothesis. These are the first explicit bounds for this problem, and are significantly better than previously known asymptotic bounds. Applied to the integers, they express that any subgroup of index ii of the multiplicative group of integers modulo mm is generated by prime numbers smaller than 16(ilogm)216(i\log m)^2, subject to the Riemann Hypothesis. Two particular consequences relate to mathematical cryptology. Applied to cyclotomic fields, they provide explicit bounds on generators of the relative class group, needed in some previous work on the shortest vector problem on ideal lattices. Applied to Jacobians of hyperelliptic curves, they allow one to derive bounds on the degrees of isogenies required to make their horizontal isogeny graphs connected. Such isogeny graphs are used to study the discrete logarithm problem on said Jacobians.

Keywords

Cite

@article{arxiv.1807.01561,
  title  = {Generating subgroups of ray class groups with small prime ideals},
  author = {Benjamin Wesolowski},
  journal= {arXiv preprint arXiv:1807.01561},
  year   = {2019}
}

Comments

ANTS-XIII, Thirteenth Algorithmic Number Theory Symposium

R2 v1 2026-06-23T02:50:34.931Z